The general theory developed by Ben Yaacov for metric structures provides Fraïssé limits which are approximately ultrahomogeneous. We show here that this result can be strengthened in the case of relational metric structures.
Jan 8, 2019
Aug 16, 2021 · The general theory developed by Ben Yaacov for metric structures provides Fraïssé limits which are approximately ultrahomogeneous.
The general theory developed by Ben Yaacov for metric structures provides Fraisse limits which are approximately ultrahomogeneous.
Jan 8, 2019 · The general theory developed by Ben Yaacov for metric structures provides Fra\"iss\'e limits which are approximately ultrahomogeneous.
Abstract. The general theory developed by Ben Yaacov for metric structures provides Fraïssé limits which are approximately ultrahomogeneous. We show here that ...
Oct 22, 2024 · The general theory developed by Ben Yaacov for metric structures provides Fraïssé limits which are approximately ultrahomogeneous.
In mathematical logic, specifically in the discipline of model theory, the Fraïssé limit is a method used to construct (infinite) mathematical structures ...
Missing: Metric | Show results with:Metric
We show that a class of finitely generated structures is Fraïssé if and only if it is the age of a separable approximately homogeneous structure, and conversely ...
(ii) Conversely, every countable ultrahomogeneous structure is the limit of a. Fraïssé class, namely, its age. Moreover, the limit is universal for ...
[PDF] Fraïssé limits in functional analysis - ScienceDirect.com
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A complete introduction to the logic for metric structures can be found in [9]. We recall here the key concepts. The language L is a countable collection of ...
Missing: Relational | Show results with:Relational